This is an exercise problem from Robert Sedgewick's Algorithms In C, Part 5.
Both Dijkstra's Algorithm and Floyd's Algorithm calculates all-pairs shortest paths of a weighted digraph properly, storing distances between every pair of vertices in an array
d[V, V]. Further, the
P[V, V] array stores the next vertex to take on the shortest path from
t. The two arrays answer shortest path queries in constant time.
However, on systems with limited space, we want to achieve below time-space trade off:
For sparse graphs, cut space cost to be proportional to
V, by increasing query time to be proportional to
Can anyone please point me some direction to follow? Thanks.